wbjee 2020 maths question answerkey solutions
TRANSCRIPT
WB-JEE-2020 (Mathematics)
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_________________________________________________________________________________________ 1. Let (x) = f(x) + f (1–x) and f"(x) < in [0,1], then
a. is monotonic increasing in 1
0,2
and monotonic decreasing in 1
,12
b. is monotonic increasing in 1
,12
and monotonic decreasing in 1
0,2
c. neither increasing nor decreasing in any sub interval of [0,1]
d. neither is increasing in [0,1]
2. Let cos–1 y
b
= logn
x
n
. Then
2
2
d y dyHereyz ,y1
dx dx
a. x2 y2 + xy1 + n2y = 0
b. xy2–xy1 + 2n2y=0
c. x2yz + 3xy1 – n2y = 0
d. xyz + 5xy1 – 3y = 0
3. f(x) '(x)f'(x)
dx(f(x) (x) 1 f(x) (x)–1)
=
+
a. sin–1 f(x)
c(x)
+
b. cos–1 2 2(f(x)) –( (x) c +
c. –1 f(x) (x) 12 tan c
2
++
d. –1 f(x) (x) 12 tan c
2
++
4. The value of –2n 2n 110 10
27 27
n 1 n 1–2n–1 2n
sin xdx sin xdx+
= =
+ is equal to
a. 27
b. 54
c. –54
d. 0
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5. 2
2
0[x ] is equal
a. 1
b. 5– 2 – 3
c. 3– 2
d. 8
3
6. If the tangent to the curve y2–x3 at (m2, m3) is also a normal to the curve at (M2, M3), then the
value of mM is :
a. 1
–9
b. 2
–9
c. 1
–3
d. 4
–9
7. If x2 + y2 = a2
a. 2a
b. a
c. 1
2 a
d. 1
4 a -
8. Let f, be a continuous function in [0,1] then n
nj 0
1 jlim f
n n→=
a. 1/2
0
1f(x)dx
2
b. 1
1/2
f(x)dx
c. 1
0
f(x)dx
d. 1/2
0
f(x)dx
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9. Let f be a differentiable function with
xlimf(x)
→= 0. If y'+ yf'(x) –f(x) = 0,
xlim y(x)
→= 0, then
(where y' dy
dx)
a. y + 1 = ef(x) + f(x) b. y – 1 = ef(x) + f(x) c. y + 1 = e–f(x) + f(x) d. y – 1 = e–f(x) + f(x)
10. Let f(x) = 1– 2(x ) where the square root is to be taken positive, then
a. f has no extrema at x = 0 b. f has minima at x = 0 c. f has maxima at x = 0 d. f' exist at 0
11. If x sin y y
dy ysin – xx x
=
dx, x > 0 and y(1) =
2
then the value of cos
y
x
is
a. 1 b. Log x c. e d. 0
12. If the function f(x) = 2x3–9ax2 + 12a2x + 1[a > 0] attains its maximum and minimum at p
and q respectively such that p2 = q, then a is equal to
a. 2
b. 1
2
c. 1
4
d. 3
13. If a and b are arbitrary positive real numbers, then the least possible value of 6a 10b
5b 3a+ is
a. 4
b. 6
5
c. 10
3
d. 68
15
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14. If 2log(x+1)–log(x2–1)–log2, then x = a. Only 3 b. –1 and 3 c. only–1 d. 1 and 3
15. The number of complex p such that |p| = 1 and imaginary part of p4 is 0, is
a. 4 b. 2 c. 8 d. Infinitely many
16. The equation zz (2–3i)z + (2 + 3i) z + 4 = 0 represents a circle of radius
a. 2 unit b. 3 unit c. 4 unit d. 6 unit
17. The expression ax2 + bx + c (a, b and c are real) has the same sign as that of a for all x is a. b2 – 4ac > 0 b. b2 – 4ac 0 c. b2–4ac 0 d. b and c have the same sign as that of a
18. In a 12 storied building, 3 person enter a lift cabin. It is known that they will leave the lift at different floor. In how many ways can they do so if the lift does not stop at the second floor? a. 36 b. 120 c. 240 d. 720
19. If the total number of m-element subsets of the set A = {a1, a2, ........., an} is k times the number of m element subsets containing a4 then n is a. (m–1)k b. mk c. (m + 1)k d. (m+2)k
20. Let I(n) = nn, J(n) = 1.3.5. ....(2n–1) for all (n > 1), nN, then
a. I(n) > J(n) b. I(n) < J(n) c. I(n) J(n)
d. I(n) = 1
2J(n)
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21. If c0,c1,c2 .....c15 are the Binomial co-efficients in the expansion of (1 + x)15, then the value of
1 3 3 15
0 1 2 14
c c c c2 3 ..... 15
c c c c+ + + + is
a. 1240 b. 120 c. 124 d. 140
22. Let A =
3– t 1 0
1 3– t 1
0 –1 0
and det A = 5, then
a. t = 1 b. t = 2 c. t = –1 d. t = –2
23. Let A =
12 24 5
x 6 2
–1 –2 3
. The value of x for which the matrix A is not in
a. 6 b. 12 c. 3 d. 2
24. Let A = a b
c d
be a 2 × 2 real matrix with det A = 1. If the equation det (A–I2) = 0 has
imaginary roots (I2 be the identify matrix of order 2), then a. (a + d)2 < 4 b. (a + d)2 = 4 c. (a + d)2 > 4 d. (a + d)2 = 16
25. If
2 2
2 2
2 2
a bc c ac
a ab b ca
ab b bc c
+
+ +
= ka2b2c2, then k is equal to:
a. 2
b. –2
c. –4
d. 4
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26. If f : S → R where S is the set of all non-singular matrices of order 2 over R and f
a b
c d
= ad – bc, then
a. f is bijective mapping b. f is one-one but not onto c. f is onto but not one-one d. f is neither one-one nor onto
27. Let the relation be defined on R by a b holds if and only if a – b is zero or irrational then a. is equivalence relation b. is reflexive & symmetric but is not transitive c. is reflexive and transitive but is not symmetric d. is reflexive only
28. The unit vector in ZOX plane, making angles 45° and 60° respectively with ˆˆ ˆ2i 2j – k = +
and ˆˆ– j – k is
a. 1 1ˆ ˆi j2 2
+
b. 1 1 ˆi – k2 2
c. 1 1ˆ ˆi – j2 2
d. 1 1 ˆi k2 2
+
29. Four persons A, B, C and D throw an unbiased die, turn by turn, in succession till one get
an even number and win the game. What is the probability that A wins if A begins?
a. 1
4
b. 1
2
c. 7
12
d. 8
15
30. The rifleman is firing at a distant target and has only 10% chance of hitting it. The least number of rounds he must fire to have more than 50% chance of hitting it at least once is a. 5 b. 7 c. 9 d. 11
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31. cos(2x+7) = a (2–sinx) can have a real solution for
a. all real values of a
b. a [2, 6]
c. a [–, 2]\{0}
d. a (0, )
32. The differential equation of the family of curves y = ex (A cos x + B sin x) where A, B are
arbitrary constant is
a. 2
2
d y
dx–9x =13
b. 2
2
d y
dx–2
dy
dx+ 2y = 0
c. 2
2
d y
dx+ 3y = 4
d. 2
dy dy
dx dx
+
– xy = 0
33. The equation r cos –3
= 2 represents
a. a circle
b. a parabola
c. an ellipse
d. a straight line
34. The locus of the centre of the circles which touch both the circles x2 + y2–a2 and x2 + y2–4ax
externally is
a. a circle
b. a parabola
c. an ellipse
d. a hyperbola
35. Let each of the equations x2 + 2xy + ay2 = 0 & ax2 +2xy + y2= 0 represent two straight lines
passing through the origin. If they have a common line, then the other two lines are given
by
a. x – y = 0, x – 3y = 0
b. x + 3y = 0, 3x + y = 0
c. 3x + y = 0, 3x – y = 0
d. (3x – 2y) = 0, x + y = 0
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36. A straight line through the origin O meets the parallel lines 4x + 2y = 9 and 2x + y +6 = 0 at P and Q respectively. The point O divides the segment PQ in the ratio a. 1 : 2 b. 3 : 4 c. 2 : 1 d. 4 : 3
37. Area in the first quadrant between the ellipse x2 + 2y2 – a2 and 2x2 + y2 – a2 is
a. 2
–1a 1tan
2 2
b. 2
–13a 1tan
4 2
c. 2
–15a 1sin
2 2
d. 29 a
2
38. The equation of circle of radius 17 unit, with centre on the positive side of x-axis and through the point (0, 1) is a. x2 + y2 – 8x – 1 = 0 b. x2 + y2 + 8x – 1 = 0 c. x2 + y2 – 9y + 1 = 0 d. 2x2 + 2y2 – 3x + 2y = 0
39. The length of the chord of the parabola y2 =4ax (a > 0) which passes through the vertex
and makes an acute angle with the axis of the parabola is a. ±4a cot cosec b. 4a cot cosec c. –4a cot cosec d. 4a cosec2
40. A double ordinate PQ of the hyperbola 2 2
2 2
x y–
a b= 1 is such that OPQ is equilateral, O being
the centre of the hyperbola. Then the eccentricity e satisfies the relation
a. 1 < e < 2
3
b. e = 2
3
c. e = 3
2
d. e > 2
3
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41. If B and B’ are the ends of the minor axis and S and S’ are foci of the ellipse 2 2x y
25 9+ = 1,
then the area of the rhombus SBS’ B’ will be
a. 12 sq. unit
b. 48 sq. unit
c. 24 sq. unit
d. 36 sq. unit
42. The equation of the latus rectum of a parabola is x + y = 8 and the equation of the tangent
at the vertex is x + y = 12. Then the length of the latus rectum is
a. 4 2 units
b. 2 2 units
c. 8 units
d. 8 2 units
43. The equation of the plane through the point (2, –1, –3) and parallel to the lines
x –1 y 2 z
2 3 –4
+= = and
x y –1 z –2
2 –3 2= = is
a. 8x + 14y + 13z + 37 = 0
b. 8x – 14y – 13z – 37 = 0
c. 8x – 14y – 13z + 37 = 0
d. 8x – 14y + 13z + 37 = 0
44. The sine of the angle between the straight line x –2 y –3 z – 4
3 4 5= = and the plane
2x–2y + z = 5 is
a. 2 3
5
b. 2
10
c. 4
5 2
d. 5
6
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45. Let f(x) –sin x + co sax be periodic function. Then a. ‘a’ is real number b. ‘a’ is any irrational number c. ‘a’ is any rational number d. a = 0
46. The domain of f(x) = 1
– (x 1)x
+
is
a. x > –1
b. (–, )\{0}
c. 5 –1
0,2
d. 1– 5
,02
47. Let y = f(x) = 2x2–3x + 2. The differential of y when x changes from 2 to 1.99 is
a. 0.01 b. 0.18 c. –0.05 d. 0.07
48. If 1/x
x
1 cxlim
1– cx→
+
= 4, then 1/x
x
1 2cxlim
1–2cx→
+
is
a. 2 b. 4 c. 16 d. 64
49. Let f : R → R be twice continuously differentiable (or f” exists and is continuous) such that f(0) = f(1) = f’(0) = 0. Then
a. f”(c) = 0 for some c R b. there is no point for which f” (x) = 0 c. at all points f”(x) > 0 d. at all points f”(x) < 0
50. Let f(x) = x13 + x11 + x9 + x7 + x5 + x3 + x + 12. Then
a. f(x) has 13 non-zero real roots b. f(x) has exactly one real root c. f(x) has exactly one pair of imaginary roots d. f(x) has no real root
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51. Let z1 and z2 be two imaginary roots of z2 + pz +q = 0, where p and q are real. The points z1, z2 and origin form an equilateral triangle if a. p2 > 3q b. p2 < 3q c. p2 = 3q d. p2 = q
52. If the vectors 2 ˆˆ ˆi aj a k, = + + 2 ˆˆ ˆi bj b k = + + and 2 ˆˆ ˆi cj c k = + + are three non-coplanar
vectors and
2 3
2 3
2 3
a a 1 a
b b 1 b
c c 1 c
+
+
+
= 0, then the value of abc of
a. 1 b. 0 c. –1 d. 2
53. If the line y = x is a tangent to the parabola y = ax2 + bx + c at the point (1,1) and the curve
passes through (–1, 0), then a. a = b = –1, c = 3
b. a = b = 1
2, c = 0
c. a = c = 1
4, b =
1
2
d. a = 0, b = c = 1
2
54. In an open interval 0,2
,
a. cos x + x sin x < 1 b. cos x + x sin x > 1 c. no specific order relation can be ascertained between cos x + x sin x and 1 d. cos x + x sin x > 1
55. The area of the region {(x,y) : x2 + y2 1 x + y} is
a. 2
2
b. 4
c. 4
–
1
2
d. 2
3
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56. If P(x) = ax2 +bx + c and Q(x) = – ax2 + dx + c, where ac 0 [a, b, c, d are all real], then P(x).
Q(x) = 0 has
a. at least two real roots
b. two real roots
c. four real roots
d. no real root
57. Let A = {x R : –1 x 1} & f : A → A be a mapping defined by f(x) – x|x|. Then f is
a. Injective but not surjective
b. Surjective but not injective
c. Neither injective nor surjective
d. bijective
58. Let f(x) = 2x –3x 2+ and g(x) = x be two given functions. If S be the domain of f o g and
T be the domain of g o f, then
a. S = T
b. S T =
c. S T is a singleton
d. S T is an interval
59. Let 1 and 2 be two equivalence relations defined on a non-void set S. Then
a. both 1 2 and 1 2 are equivalence relations
b. 1 2 is equivalence relation but 1 2 is not so
c. 1 2 is equivalence relation but 1 2 is not so
d. Neither 1 2 nor 1 2 is equivalence relation
60. Consider the curve2 2
2 2
x y1
a b+ = . The portion of the tangent at any point of the curve
intercepted between the point of contact and the directrix subtends at the corresponding
focus an angle of:
a. 4
b. 3
c. 2
d. 6
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61. A line cuts x-axis at A(7,0) and the y-axis at B(0, –5). A variable line PQ is drawn
perpendicular to AB cutting the x-axis at P(a, 0) and the y-axis at Q(0,b). If AQ and BP
intersect at R, the locus of R is
a. x2 + y2 + 7x + 5y = 0
b. x2 + y2 + 7x – 5y = 0
c. x2 + y2 – 7x + 5y = 0
d. x2 + y2 – 7x – 5y = 0
62. Let 0 < < < 1. Then 1/(k )n
nk 1 1/(k )
dxlim
1 x
+
→= +
+ is
a. loge
b. loge 1
1
+
+
c. loge 1
1
+
+
d.
63. x 1
1 1lim –
lnx (x–1)→
a. Does not exist
b. 1
c. 1
2
d. 0
64. Let y = 1
1 x lnx+ +, Then
a. x dy
dx+ y = x
b. xdy
dx= y (y ln x –1)
c. x2 dy
dx= y2 + 1 – x2
d. x2
dy
dx
= y – x
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65. Consider the curve y = be–x/a where a and b are non-zero real numbers. Then
a. x y
a b+ = 1 is tangent to the curve at (0,0)
b. x y
a b+ = 1 is tangent to the curve where the curve crosses the axis of y
c. x y
a b+ = 1 is tangent to the curve at (a, 0)
d. x y
a b+ = 1 is tangent to the curve at (2a, 0)
66. The area of the figure bounded by the parabola x = –2y2, x = 1–3y2 is
a. 1
3square unit
b. 4
3 square unit
c. 1 square unit
d. 2 square unit
67. A particle is projected vertically upwards. If it has to stay above the ground for 12 seconds,
then
a. velocity of projection is 192 ft/sec
b. greatest height attained is 600 ft
c. velocity of projection is 196 ft/sec
d. greatest height attained is 576 ft
68. The equation 2
3 39
(log x) – log x 52x –3 3
+
a. at least one real root
b. exactly one real root
c. exactly one irrational root
d. complex roots
69. In a certain test, there are n questions. In this test 2n–I students gave wrong answers to at
least i questions, where i = 1,2…… , n. If the total number of wrong answer given is 2047,
then n is equal to
a. 10
b. 11
c. 12
d. 13
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70. A and B are independent events. The probability that both A and B occur is 1
20 and the
probability that neither of them occurs is3
5. The probability of occurrence of A is
a. 1
2
b. 1
10
c. 1
4
d. 1
5
71. The equation of the straight line passing through the point (4, 3) and making intercepts on
the co-ordinate axes whose sum is –1 is
a. x y
– 12 3
=
b. x y
1–2 1
+ =
c. x y
– 13 1
+ =
d. x y
– 11 2
=
72. Let f(x) = 1
3x sin x – (1–cos x). The smallest positive integer k such that
kx 0
f(x)lim
x→ 0 is
a. 4
b. 3
c. 2
d. 1
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73. Consider a tangent to the ellipse 2 2x y
12 1
+ = at any point. The locus of the midpoint of the
portion intercepted between the axes is
a. 2 2x y
12 4
+ =
b. 2 2x y
14 2
+ =
c. 2 2
1 11
3x 4y+ =
d. 2 2
1 11
2x 4y+ =
74. Tangent is drawn at any point P(x, y) on a curve, which passes through (1, 1). The tangent
cuts X-axis and Y-axis at A and B respectively. If AP : BP = 3 : 1, then
a. the differential equation of the curve is 3x dy
dx+ y = 0
b. the differential equation of the curve is 3x dy
dx– y = 0
c. the curve passes through 1
,28
d. the normal at (1, 1) is x +3y = 4
75. Let y = 2
2
x
(x 1) (x 2)+ +. Then
2
2
d y
d x is
a. 4 3 3
3 3 42 –
(x 1) (x 1) (x 2)
+ + + +
b. 3 2 3
2 4 53
(x 1) (x 1) (x 2)
+ + + + +
c. 3 2 3
6 4 3–
(x 1) (x 1) (x 1)
+ + + +
d. 3 2 3
7 3 2–
(x 1) (x 1) (x 1)
+ + + +
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ANSWER KEYS
1. (a) 2. (a) 3. (c) 4. (d) 5. (b) 6. (d) 7. (c) 8. (c) 9. (c) 10. (c)
11. (b) 12. (a) 13. (a) 14. (a) 15. (c) 16. (b) 17. (c) 18. (d) 19. (b) 20. (a)
21. (b) 22. (d) 23. (c) 24. (a) 25. (d) 26. (d) 27. (b) 28. (b) 29. (d) 30. (b)
31. (G) 32. (b) 33. (d) 34. (d) 35. (b) 36. (b) 37. (a) 38. (a) 39. (b) 40. (d)
41. (c) 42. (d) 43. (G) 44. (b) 45. (c) 46. (c) 47. (c) 48. (c) 49. (a) 50. (b)
51. (c) 52. (c) 53. (c) 54. (b) 55. (c) 56. (a) 57. (d) 58. (d) 59. (b) 60. (c)
61. (c) 62. (b) 63. (c) 64. (b) 65. (b) 66. (b) 67. (a,d) 68. (a,c) 69. (b) 70. (c,d)
71. (a,b) 72. (c) 73. (d) 74. (a,c) 75. (a)
* G – Indicates GRACE MARK awarded for the question number
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SOLUTIONS
1. (a)
(x) = f(x) + f(1 – x)
Differentiate w.r.t. x
’(x) = f’(x) – f’(1 – x) .....(i)
f’(x) – f’(1 – x) 0 (for monotonic increasing)
f’(x) f’(1– x), x 1 – x ( f’(x) is decreasing)
x 1 – x
2x 1
1x
2 is monotonic increasing in
10,
2
and monotonic decreasing in 1
, 12
2. (a) Given that
cos–1y
b
= log n
x
n
Differentiate w.r.t. x
2
–1 1 dy. .b dxy
1–b
= n. n 1
.x n
2 2
–b 1 dy n. .b dx xb – y
=
2 2
–1 dy n.dx xb – y
=
xy1 = –n 2 2b – y
Squaring both sides x2y12 = n2 (b2–y2) x2y12 = n2b2 – n2y2
Differentiate both sides 2xy12 +x2. 2y1. y2 = –n2. 2y. y1 xy1 + x2y2 = – n2y x2y2 +xy1 + n2y = 0
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3. (c)
Let I = ( )
f(x) '(x) (x)f'(x)dx
f(x) (x) 1 f(x) (x)–1
+
+
Let f(x) (x)–1 = t2 f’(x)(x) + f(x)'(x) = 2t dt
dx
[f’(x)(x) + f(x) ’(x)] dx = 2tdt
I = 2
2tdt
(t 2)(t)+
I = 2 2 2
1dt
(t ) ( 2)+
I = 2
2tan–1
t
2+ c
I = 2 tan–1 f(x) (x)–1
2
+ c
4. (d) –2n 2n 110 10
27 27
n 1 n 1–2n–1 2n
sin xdx sin xdx+
= =
+
Let x = –t 2n2n 1–
+
dx = – dt
2n 2n 110 10
27 27
n 1 n 12n 1 2n
sin (–t)(–dt) sin xdx+
= =+
+
2n 2n 110 10
27 27
n 1 n 12n 1 2n
sin t .dt sin xdx+
= =+
+
b a
a b
f(x)dx – f(x)dx
=
2n 1 2n 110 10
27 27
n 1 n 12n 2n
– sin t dt sin xdt+ +
= =
+
Let t = x
dt = dx
2n 1 2n 110 10
27 27
n 1 n 12n 2n
– sin xdx sin xdx+ +
= =
+
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5. (b)
2
2
0[x ]dx
1 2 3 2
0 1 2 3
0dx 1dx 2dx 3dx+ + +
+ 21[x] + 3 2
2 3[2x] [3x]+
2 –1 2 3 –2 2 6–3 3+ +
5 – 3 – 2
6. (d)
C: y2 = x3
Differentiate w.r.t. x
2y dy
dx= 3x2
2dy 3x
dx 2y= = m (slope)
Slope of tangent at (m2, m3)
m1 = 2 2
3
3(m )
2(m )
m1 = 4
3
3m 3m
2m 2=
Slope at (M2, M3)
m1 = 2 2
3
3(M )
2M
m2 = 4
3
3M 3M
2M 2=
Now tangent and normal are perpendicular to each other.
m1 m2 = –1
3m 3M.
2 2= –1
m M = –4
9
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7. (c) Given that x2 + y2 = a2 Differentiate w.r.t. x
2x +2y dy
dx= 0
dy x–
dx y= …….(1)
Now,
2a
0
dy1 dx
dx
+
= a 2
2
0
x1 dx
y+ {from equation …(1)}
= a
2 2
0
1a dx
a – x
= aa
–1
0
xsin
a
= a2
= a
2
8. (c)
n
ni 0
1 ilim f
n n→=
Let 1
dxn
→
ix
n→
upper limit lower limit
n
nlim 1
n→=
n
0lim 0
n→=
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( )1
0
f x dx
9. (c) y’ + y f’(x) – f(x)f’(x) = 0 dy
dx+ yf’(x) = f(x)f’(x)
Compare to linear differential equation dy
dx+ py = q
So p = f’(x) q = f(x) f’(x)
Integrating factor = pdx f '(x)dx
e e = = ef(x)
Now, y.ef(x) = f (x)e .f(x).f '(x)dx
Let f(x) = t f’(x)dx = dt
y.ef(x) = tt.e dt c+
{Using by part}
yef(x) = tet – te dt c+
yef(x) = et(t–1)+ c
yef(x) = ef(x) (f(x)–1) + c
{Given xlim
→f(x)=0,
xlim
→y(x) =0}
(0)(e°) = e°(0–1) + c c = 1
yef(x) = ef(x)(f(x)–1) +1
y = (f(x)–1) + e–f(x)
y + 1 = f(x) + e–f(x)
10. (c)
f(x) = 1– 2(x)
f(x) = 1– |x|
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1
–1 1
0
f(X) is maximum at x = 0 and is 1
11. (b)
x sin y
x
dy = y
ysin – xx
dx
sin y
x
dy
dx=
1
x
yysin – x
x
sin y
x
dy
dx=
y
xsin
y
x
–1
y ysin –1
dy x x
ydxsin
x
=
Let y
x= v
dy
dx= v + x
dv
dx
v + xdv
dx=
vsinv –1
sinv
x dv
dx=
vsinv –1
sinv– v
xdv
dx= –
1
sinv
Integrate both side
– 1
sinvdv dxx
=
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cos v = log x + c cosy
x= log x + c
{ give y(1) – 2
x = 1, y =
2
}
cos 2
= log 1 + c c = 0
cos y
x
= log x
12. (a)
f(x) = 2x3 – 9ax2 + 12a2x + 1
Differentiate w.r.t. x
f’(x) = 6x2 – 18ax + 12a2 …….(1)
For extreme values
f’(x) = 0
6x2 – 18ax + 12a2 = 0
x2 – 3ax + 12a2 = 0
(x–a) (x–2a) = 0
x = a, 2a
Again differentiate equation (1) w.r.t. x
f”(x) = 12 x – 18 a
x = a
f”(a)=12a–18a = –6a
f”(a) < 0
So, maximum at x = a = p
x = 2a
f”(2a)=12(2a)–18(a) = 6a
f”(2a) > 0
So, minimum at x = 2a = q
Now,
P2 = q
(a)2 = 2a
a = 2
13. (a)
Using the concept of A.M. G.M
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A.M. G.M.
1
2
6a 10b6a 10b5b 3a
2 5b 3a
+
6a 10b
5b 3a+ 2 ( )
1
24
6a 10b
5b 3a+ 4
The least possible value of 6a 10b
5b 3a+ is 4
14. (a) 2 log (x + 1) – log (x2 – 1) = log2 log (x + 1)2 – log (x2 – 1) = log2
log 2
2
(x 1)
(x –1)
+= log2
2(x 1)
(x 1)(x–1)
+
+= 2
x + 1 = 2x – 2
x = 3
15. (c) Let p = x + iy Squaring both side
p2 = x2 + i2y2 + 2ixy p2 = x2 – y2 + 2ixy
Squaring both side p4 = [(x2 – y2) + 2ixy]2 p4 = (x2 – y2)2 + (2ixy)2 + 4ixy(x2 – y2) Imaginary part of p4 is 0 xy(x2 – y2) = 0
x3y – xy3 = 0 x = ±y |p| = 1 x2 + y2 = 1
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2y2 = 1 x = 0
y = ±1
2 y = ±1
x = ±1
2 & y = 0 x ± 1
Total value of p is 8.
16. (b) Given that z z + (2–3i) z + (2 + 3i) z + 4 = 0 centre and radius of z z + az az+ + b = 0
are –a and aa – b
radius = (2–3i)(2 3i)– 4+
= 13–4 = 9 = 3 unit
17. (c)
Given that
ax2 + bx + c has the same sign
Case-I: If a > 0, ax2 + bx + c > 0, So b2 –4ac < 0
a > 0 D < 0
x
Case-II: If a < 0, ax2 +bx + c 0 So D 0
a > 0
D 0
x
18. (d)
The lift can stop at 12–1–1 = 10 floors (except the floor they enter and second floor)
Total number of ways = 103P
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= 10 × 9 × 8 =720
19. (b)
Set A = {a1, a2, a3, a4, ……. , an}
From set of n element selecting a subset of m element = nCm
Now, a4 is already selected.
Total number of sets which contains an is n–1Cm–1
Now, it is given that
nCm = K. n–1Cm–1
n! (n–1!)
K.m!(n – m)! (m–1)!(n– m)!
=
n
m= k
n = mk
20. (a)
Using the concept of A.M. G.M.
For J(n) A.m. > G. m.
1 3 5...... (2n–1)
n
+ + + > (1.3.5. ……(2n–1))1/n
2n
n > ( )( )
1
nJ n
n > ( )( )1
nJ n
nn > J(n)
I(n) > J(n)
21. (b)
Let Sn = 15 15 15 15
1 2 3 1515 15 15 15
0 1 2 14
C 2 C 3 C 15 C.....
C C C C+ + + +
Sn = 1515
r15
r 1 r–1
r. C
C=
Sn = 15
r 1
r(15– r 1)
r=
+
nr
nr–1
C n – r 1
C r
+=
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Sn = 15
r 1
(16–r)=
Sn = 1 + 2 + 3 + 4 + …….. + 15
Sn = 15(16)
2
Sn = 120
22. (d)
A =
3– t 1 0
1 3– t 1
0 –1 0
|A| = –1 [(–1) (3–t)–0]
5 = –1(t – 3)
5 = 3 – t
t =–2
23. (c)
A =
12 24 5
x 6 2
–1 –2 3
if matrix is not invertible |A| = 0
|A| =
12 24 5
x 6 2
–1 –2 3
= 0
[–1(48–30) + 2 (24–5x) + 3 (72–24x)] = 0
–18 + 48 – 10x + 216 –72 x = 0
–82x = –246
x = 3
24. (a)
A = a b
c d
det A = a b
c d= 1
det A = ad – cb = 1 …….(1)
Now,
A–I2 = 0
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a b
c d
– 1 0
0 1
= 0
a – b
c d –
= 0
a – b
c d –
= 0
(a – ) (d – ) – cb = 0
2– (a + d) + ad – cb = 0
2– (a + d) + 1 = 0 {from eq. (1)}
roots are imaginary
D < 0
(a + d)2 – 4(ad–cb) < 0
(a + d)2 < 4
25. (d) 2 2
2 2
2 2
a bc c ac
a ab b ca
ab b bc c
+
+
+
2
2
2
a bc c(c a)
a(a b) b ca
ab b(b c) c
+
+
+
abc
a c a c
a b b a
b b c c
+
+
+
c3 → c3 – c1 – c2
(abc)
a c 0
a b b –2b
b b c –2b
+
+
(–2b) (abc)
a c 0
a b b 1
b b c 1
+
+
(–2b) (abc) (–2ac)
4a2b2c2
So, 4a2b2c2 = ka2b2c2
k = 4
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26. (d)
Given that
f a b
c d
= ad – bc
f 2 0
0 2
= 4 – 0 = 4
f 4 0
0 1
= 4 – 0 = 4
not one-one function
As O R but s does not contain any singular matrix so, f is not onto.
27. (b)
If a – b = 0 then b – a = 0
If a – b is irrational then b – a is irrational
a b → b a symmetric
a R, a – a = 0, a a reflexive
If a = 2, b = 2 , c = 3 then
a b, b c but a c is not true not transitive.
28. (b)
Given that
ˆˆ ˆ2i 2j – k = + | | 4 4 1 = + + = 3
ˆj – k = | | 1 1 2 = + =
Let the vector be ˆˆxi zk = + | | = 1
{Vector in zox plane}
. = | || | cos 45°
ˆˆ(xi zk)+ . ˆˆ ˆ(2i 2j – k)+ = (3) 1
2
2x – z = 3
2 ……(1)
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. = | || | cos 60°
ˆ ˆˆ ˆ(xi zk).( j – k)+ = (1)( 2 ) 1
2
– z = 1
2
z = –1
2 …… (2)
Comparing eq. (1) & eq. (2)
x = 1
2
1 1 ˆi – – k2 2
=
29. (d)
A wins 1st attempt P(even number) = 1
2
P(odd number) = 1–1
2=
1
2
P(A win) = P(A) + P( A ) P(B) P( C ) P(D) P(A) +…….
(A win) = 1
2+
1
2.
1
2.
1
2.1
2.
1
2 + …….
=1
2+
41
2
1
2
+ 8
1
2
1
2
+ ……
=1
2+
51
2
+ 9
1
2
+ …….
Using the concept of sum of infinite G.P.
P(A win) = 4
1a 2
1– r 11–
2
=
= 1 16
2 15 =
8
15
30. (b)
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P (hitting a target) = 1
10
P (not hitting a target) = 1 – 1
10=
9
10
Let number of trials = n
Now, P (missing all) + P (hitting at least once) = 1
P(hitting at least once) = 1 – P(missing)
= 1–n
9 1
10 2
(0.9)n 0.5
Now, n = 6 (0.9)6 = 0.531441
n = 7 (0.9)7 = 0.4782969
Require at least 7 shots
31. (G)
Bonus
32. (b) y = ex (A cos x + B sin x) Differentiate w.r.t. x
dy
dx= ex(A cos x + B sin x) + ex (–A sin x +B cos x)
dy
dx= y + ex(–A sin x +B cos x)
Again differentiate w.r.t. x
2
2
d y dy
dx dx= + ex (–A sin x + B cos x ) + ex(–A cos x – B sin x)
2
2
d y dy
dx dx= +
dy
dx– y – ex(A cos x +B sin x)
2
2
d y dy–2
dx dx+ 2y = 0
33. (d)
r cos –3
= 2
{ cos (A – B) = cos A cos B +sin A sin B}
r cos .cos sin .sin3 3
+
= 2
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r1 3
cos sin2 2
+
= 2
rcos 3rsin
2 2
+ = 2
r cos + 3rsin = 4
{Let r cos = x, r sin = y}
x + 3 y = 4
34. (d)
Let c1 : x2 + y2 = a2 c2: (x–2a)2 + y2 = 4a2 Let, centre = (h, k) and radius = r for the variable circle So using c1c2 = r1 + r2 for both cases we have: h2 + k2 = (r + a)2 …..(1) And (h–2a)2 + k2 = (r + 2a)2 ……(2) Equation (2) – equation (1)
r = a – 4h
2…… (3)
Substitute (3) in eq. (1) to get
h2 + k2= 2
a – 4ha
2
+
12h2 – 4k2 – 24ah + 9a2 = 0
locus: 12x2 – 4y2 – 24ax + 9a2 = 0 i.e. a hyperbola
35. (b)
Given that
x2 + 2xy +ay2 = 0
2x x
2y y
+
+ a = 0 ……..(1)
ax2 +2xy + y2 = 0 a
2x x
2y y
+
+ 1 = 0 ……..(1)
{Taking x
yas a single variable}
exactly one root in common
(a1b2 – a2b1) (b1c2 – b2c1) = (a1c2 – a2c1)2
(2–2a) (2 – 2a) = (1 – a2)2
(2–2a)2 = (1–a2)2
a = 1 or –3
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‘a’ cannot be 1 So, a = –3
1st equation
2x x
2y y
+
+ 1 = 0
Roots: –1, –3
2nd equation
2x x
–3 2 1 0y y
+ + =
Roots: 1, – 1
3
So other lines: x
y = –3 and
x
y= –
1
3
x = –3y and 3x = –y
x +3y = 0 and 3x + y = 0
36. (b)
M
P
O (–3,0)
Q N
(0,–6)
2x+ y + 6 = 0
4x+ 2y = 9
90,
2
9, 0
4
OPM ~ OQN OP OM
OQ ON=
OP 9 / 2
OQ 6 =
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OP 3
OQ 4 =
37. (a)
C1: x2 + 2y2 = a2
C2: 2x2 + y2 = a2
To find intersect point
a aP ,
3 3
=
,
a –aQ ,
3 3
=
–a –aR ,
3 3
=
,
–a –aS ,
3 3
=
S P
R Q
O
a a,
3 3
a
2
a/ 3 a/ 2
2 2 2 2
O a/ 3
1Area a – x dx a –2x dx
2= +
a/ 322 2 –1
0
1 x a xa – x sin
2 2 a2
= +
+
a/ 22
2 2 –1
a/ 3
x a 2xa –2x sin
2 a2 2
+
2–1a 1
tan2 2
=
38. (a)
Given that
Centre on positive side of x-axis (a, 0) (a > 0)
Radius = 17
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Equation of circle: (x – a)2+ (y – 0)2 = ( 17 )2
(x – a)2 + y2 = 17
As, it passes through (0, 1)
(0 – a)2+(1)2 = 17
a2 + 1 = 17
a2 = 16
a = 4 { a > 0}
Equation of circle is
(x – 4)2 + y2 = 17
x2 – 8x + y2 + 16 = 17 x2 + y2 – 8x –1 = 0
39. (b)
0 x
y P
Equation OP is: (y – 0) = tan (x – 0) y = x tan Solving with y2 = 4ax, we get (x tan )2 = 4ax x2 tan2 = 4ax x tan2 = 4a x = 4a cot2 Substituting, y = (4a cot2) (tan) y = 4a cot
P = (4a cot2, 4a cot)
So, OP = 2 2 2(0– 4acot ) (0– 4acot ) +
OP = 4a cot cosec As 0° < < 90° so cot > 0, cosec > 0
40. (d)
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0 x
y P
m
Q
Let P = (a sec , b tan) & Q (a sec , – b tan )
In OPM
tan 30° = btan
asec
1 bsin
a3
=
a
3sinb
=
Eccentricity e2 = 1 + 2
2
b
a
e2 = 1+ 2
1
3sin
e2 > 1+ 1
3 { max sin2 = 1}
e2 > 4
3
e > 2
3
41. (c)
2 2x y
Ellipse : 125 9
+ =
a2 = 25 a = ± 5
b2 = 9 b = ± 3
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Eccentricity (e) = 2
2
b1–
a
9
e 1–25
=
4
e5
=
S’
S O
B(0,3)
A(5,0) A’(–5,0)
B’(0,–3)
S & S’ foci of the ellipse
S = (ae, 0) = 4
5 , 05
= (±4, 0)
Area of Rhombus = 4 × area of BOS
= 4 × 1
OS OB2
= 4 × 1
4 32
= 24 sq. units
42. (d)
Given that
L1 : x + y = 8
L2 : x + y = 12 C1 = 8, C2 = 12, a = 1, b = 1
The distance between latus rectum and equation of tangent at vertex is ‘a’.
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Here 1 2
2 2
C –Ca
a b=
+
8 –12
a1 1
=+
4
a2
=
a 2 2=
Hence, length of latus rectum is
LR = 4a
( )4 2 2=
8 2= units
43. (G)
Bonus
44. (b)
Given that
Line: x –2 y –3 z – 4
3 4 5= =
ˆˆ ˆb 3i 4j 5k= + +
Plane: 2x – 2y + z = 5
ˆˆ ˆn 2i –2j k 5= + = (In Cartesian form)
Now,
( )b.n
cos 90 –b n
=
( ) ( )ˆ ˆˆ ˆ ˆ ˆ3i 4j 5k . 2i –2j k
ˆ ˆˆ ˆ ˆ ˆ3i 4j 5k 2i –2j k
+ + +=
+ + +
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6 – 8 5
9 16 25 4 4 1
+=
+ + + +
3
5 2.3=
2
10=
45. (c) f(x) = sinx + cos ax
Period of sinx + cos ax is LCM of 1 and a but LCM of rational multiple of same irrational is defined.
46. (c)
( )1
f x – x –1x
=
x > 0, x + 1 0 x –1
& 1
– x 1 0x
+
1
x 1x
+
Squaring both side
1
x 1x
+
x2 + x – 1 0
( )( )
( )
–1 1– 4 1 –1x
2 1
=
–1 5
x2
=
5 –1
x 0,2
47. (c)
x = –0.01 { changes from 2 to 1.99}
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f(x) = 2x2 – 3x + 2
Differentiate w.r.t. x
f’(x) = 4x – 3
Now,
y = f’(x)x
y = f’(2)(–0.01)
y = [4(2) – 3] (–0.01)
y = –0.05
48. (c)
Given
1
x
x 0
1 cxlim 4
1– cx→
+ =
1 form
1 cx1 –11–cxx
x 0lime 4
+
→ =
1 cx–1 cx1
1–cxx
x 0lime 4
+ +
→ =
2cx1
1–cxx
x 0lime 4
→ =
2c
1–cx
x 0lime 4
→ =
ex 0
2clim log 4
1– cx→
=
2c = 2loge2
c = loge2
Now
1
x
x 0
1 2cxL lim
1–2cx→
+ =
1 form
1 1 2cx–1 2cx
x 1–2cx
x 0lime
+ +
→
1 4cx
x 1–2cx
x 0L lime
→=
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4
1–2cx
x 0L lime
→=
4c
1L e=
4cL e=
e4log 2L e=
L = 16
49. (a)
Consider f(x) on [0, 1]
f(x) be the twice continuously differentiable function.
Applying Rolle’s theorem on the interval [0, 1].
f’(a) = 0 for some a (0, 1)
Now, applying Rolle’s theorem to f’(x) on the interval [0, a]
f”(c) = 0 for some c (0, a)
50. (b)
Given
f(x) = x13 + x11 + x9 + x7 + x5 + x3 + x + 12
Differentiate w.r.t. x
f’(x) = 13x2 + 11x10 + 9x8 + 7x6 + 5x4 + 3x2 + 1
f’(x) = ‘+’
f’(x) > 0
i.e. monotonically increasing x R
f(x) = 0 has exactly one real root
f(x) intersets x-axis at only one point
exactly one solution.
51. (c)
Given that
z2 + pz + q = 0
z1 & z2 are the roots of given equation.
Sum of root = z1 + z2 = –p
Product of roots = z1z2 = q
If z1, z2, z3 are the vertices of an equilateral
Triangle then 2 2 21 2 3 1 2 2 3 3 1z z z z z z z z z+ + = + +
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If z3 is origin then 2 21 2 1 2z z z z+ =
2 21 2 1 2 1 2 1 2z z 2z z z z 2z z + + = +
( )1 2 1 2z z 3z z + =
(–p)2 = 3q
p2 = 3q
52. (c)
2 3
2 3
2 3
a a 1 a
b b 1 b 0
c c 1 c
+
+ =
+
2 2 3
2 2 3
2 2 3
a a 1 a a a
b b 1 b b b 0
c c 1 c c c
+ =
2 2
2 2
2 2
a a 1 1 a a
b b 1 abc 1 b b 0
c c 1 1 c c
+ =
( )
2
2
2
1 a a
1 abc 1 b b 0
1 c c
+ =
2
2
2
1 a a
1 b b 0
1 c c
{ a , b & c are three non-coplanar vector}
abc + 1 = 0
abc = –1
53. (c)
Given that
C1: y = ax2 + bx + c
Differentiate w.r.t. x
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dy
2ax bdx
= + .....(1)
Given
Line: y = x
dy
1dx
= .....(2)
Slopes are equal
2ax + b = 1
at (1, 1)
2a + b = 1 .....(3)
Now, (1, 1) and (–1, 0) satisfies the curve
a + b + c = 1 .....(4)
a – b + c = 0 .....(5)
Equation (5) – equation (4)
a – b + c – a – b – c = 0 – 1
–2b = –1
1
b2
=
1
a4
= {From equation (3)}
1
c4
=
54. (b)
f(x) = cos x + x sin x – 1
Differentiate w.r.t. x
f’(x) = –sin x + sin x + x cos x > 0 ; x 0,2
f(x) is increasing function
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f(x) > f(0)
cos x + x sin x – 1 > 0
cos x + x sin x > 1
55. (c) Given that
C1: x2 + y2 = 1
C2: x + y = 1
To find intersection point
x2 + (1 – x)2 = 1
x2 + 1 – 2x + x2 = 1
2x2 – 2x = 0
x2 – x = 0
x(x – 1) = 0
x = 0, 1
for x = 0 for x = 1
0 + y = 1 1 + y = 1
y = 1 y = 0
A(0, 1) B = (1, 0)
A(0, 1)
B(1, 0)
x + y = 1
O
x2 + y2 = 1
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Area = 1
4(area of circle) – area of AOB
= ( )21 1
1 – .1 .14 2
= 1
–4 2
sq. units
56. (a)
Given
P(x) = ax2 + bx + c
D1 = b2 – 4ac
Q(x) = –ax2 + dx + c
D2 = d2 + 4ac
D1 + D2
b2 – 4ac + d2 + 4ac
b2 + d2 > 0
At least two real roots.
57. (d)
f(x) = x |x|
f(x) =
2
2
x x 0
0 x 0
–x x 0
=
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1
–1
It is one-one and onto
f(x) is bijective.
58. (d)
Given
f(x) = 2x –3x 2+
g(x) = x { x > 0} fog(x) = f[g(x)]
= f[ x ]
= x –3 x 2+
x – 3 x + 2 0
x + 2 3 x Squaring both side
(x + 2)2 (3 x )2
x2 +4x + 4 9x x2 – 5x + 4 0 (x – 1) (x – 4) 0 S = x (0,1] [4,) gof(x) = g[f(x)]
= g ( 2x –3x 2+ )
= 2x –3x 2+
x2 – 3x + 2 0 (x – 1) (x – 2) 0 T = x (–, 1] [2, ) ST = (0, 1] [4, )
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59. (b) Given 1, 2 are equivalence relations on S. 1, 2 are reflexive, symmetric and transitive. Reflexive: Let x S (x, x) 1 and (x, x) 2
(x, x) 1 2
1 2 is reflexive. Symmetric: Let (x,y) 1 2 We have to show (y, x) 1 2 (x, y) 1 2
(x, y) 1 and (x, y) 2
(y, x) 1 and (y, x) 2
(y, x) 1 2 1 2 is symmetric Transitive: Let (x, y), (y, z) 1 2
(x, y), (y, z) 1 and (x, y), (y, z) 2
(x, z) 1 and (x, z) 2
(x, z) 1 2 1 2 is transitive. Therefore 1 2 is equivalence relation. 1 2 is always reflexive and symmetric but not transitive. e.g. Let S = {1, 2, 3} 1 = {(1, 1), (2, 2) (3, 3), (1, 2), (2, 1)} 2 = {(1, 1), (2, 2) (3, 3), (2, 3), (3, 2)} 1 2 is equivalence relation. But 1 2 is not transitive as (1, 2), (2, 3) 1 2 but (1, 3) 1 2
60. (c)
Ellipse:
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P(acos, bsin)
Q
0 S(ae, 0)
x = a
e
Equation of tangent at any point P(acos, bsin) on the ellipse is xcos ysin
a b
+ = 1
Put x = a
e
acos ysin
ea b
+ = 1
y = cos b
1–e sin
Q = a cos b
, 1–e e sin
Now, slope of SQ × slope of PS
=
cos b1–
bsine sina acos – ae– aee
= ( )
2
e– cos b bsin
a(1– e )sin a(cos – e)
= –1
So, the angle between the line PS and SQ is2
.
61. (c)
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R(h,k)
x
Q
P
B
(0, –5)
A
(7, 0)
P is orthocenter of ABQ
mBR × mAR = –1
k 5 k –0
h–0 h–7
+
= –1
k(k 5)
h(h –7)
+= –1
k2 + 5k = –h(h–7)
k2 + 5k = –h2 + 7h
h2 + k2 + 5k – 7h = 0
x2 + y2 + 5y – 7x = 0
62. (b)
(Let)
L = 1/(k )n
nk 1 1/(k )
dxlim
1 x
+
→= +
+
L = 1n
k1
nk 1 k
lim n(1 x) +
→= +
+
L = n
nk 1
1 1lim n 1 – n 1
k k→=
+ +
+ +
L = n
nk 1
k 1 k 1lim n – n
k k→=
+ + ++
+ +
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L = n
nk 1
k k 1lim n
k k 1→=
+ + +
+ + +
L = 1 2 2 3
n ......1 2 2 3
+ + + + + + + +
L = loge1
1
+
+
63. (c)
Let L = x 1
1 1lim –
nx (x–1)→
L = x 1
x –1– nxlim
(x–1). nx→
0/0 form, using L Hospital’s rule
L = x 1
11–0–
xlimx –1
n xx
→
+
L = x 1
x –1lim
x nx x –1→
+
0/0 form, using L Hospital’s rule
L = x 1
1lim
nx 1 1→
+ +
L = 1
0 2
+
L = 1
2
64. (b)
y = 1
1 x nx+ +
Differentiate w.r.t. x
2
dy –1 11
dx (1 x nx) x
= +
+ +
dy
dx= –y2
x 1
x
+
x dy
dx = –y2 (x + 1)
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x dy
dx = –y2
1– nx
y
x dy
dx = –y + y2 nx
x dy
dx = y (ynx–1)
65. (b)
Given y = be–x/a Differentiate w.r.t. x dy –b
dx a= e–x/a
Tangent: x y
a b+ =1
Slope of the tangent 1 1 dy
a b dx+ = 0
dy –b
dx a=
So, x y
a b+ = 1 is tangent to the curve at the point where x = 0 y = b
So, x y
a b+ = 1 is a tangent to the curve at the point (0, b)
66. (b) C1: x = –2y2 C2: x = 1–3y2 To find intersecting point –2y2 = 1–3y2 y2 = 1 y = ± 1 So, x = –2
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(1,0)
A(–2,1)
B(–2, –1)
Area = 2 1
2 2
0
[1–3y –(2y )dy]
= 2 1
2
0
(1– y )dy
= 2
13
0
yy –
3
= 2 1
1–3
= 4
3square units.
67. (a,d)
If the initial velocity is u ft/sec then time taken for the entire motion is: t = 2u
g
g = 32 ft/sec2 and t = 12 second
t = 2u
g
12 = 2u
32
u = 192 Greatest height attained
H = 2u
29
H = 2(192)
2(32)
H = 576
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68. (a,c) 2
3 39
(log x) – log x 52x 3 3
+
=
Let log3 x = t x = 3t
2 9
t – t 5t 2(3 ) 3 3
+
=
3 29 3
t – t 5t2 2(3) (3)
+
=
Comparing
t3 – 9
2t2 + 5t =
3
2
2t3 – 9t2 + 10t = 3 2t3 – 9t2 + 10t – 3 = 0 (2t–1) (t–1) (t–3) = 0
t =1
2, 1, 3
1
1 32
1t
2t 1 t 3
x 3 x 3 x 3
x 3 x 27x 3
=
= =
= = =
= ==
x = 3 , 3, 27 are the roots of the given equation.
69. (b) The number of students answering exactly i (1 I n – 1) questions wrongly is 2n–i –2n–i–1 Thus, the total number of wrong answer is 1(2n–1–2n–2) + 2(2n–2–2n–3) + ……+ (n–1) (21–20) + n(20) +…… = 2n–1 + 2n–2 +2n–3 + ….. + 20 = 2n–1 Thus, 2n–1 = 2047 2n = 2048 2n = 211 n = 11
70. (c,d)
P(A’ B’) = 3
5
1 – P (A B) = 3
5
P(A B) = 2
5
P(A) + P(B) – P(A) P(B) = 2
5
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P(A) + P(B) = 2
5+
1
20 { P(A)P(B) =
1
20 P(B) =
1
20P(A)}
P(A) + P(B) = 9
20
P(A) + 1 9
20P(A) 20=
20[P(A)]2 + 1= 9 P(A)
20[P(A)]2 – 9P(A) +1 = 0
(4P(A)–1) (5 P(A)–1) = 0
P(A) = 1 1
,4 5
71. (a,b)
Equation of a line making an x-intercept = ‘a’ units and y – intercept = ‘b’ units is given by
x y
a b+ = 1 …….(1)
Also, a + b = –1 …..(2)
And equation (1) passes through point (4, 3)
4
a +
3
b= 1 …..(3)
From (2), b = –a–1 …..(4)
Substituting eq.(4) in eq. (3) we get
4 3
a –a –1+ = 1
4 3
–a a 1+
= 1
4a + 4 – 3a = a (a + 1)
a + 4 = a2 + a
a = ± 2
a = 2 a = –2
b = –3 b = 1
the probable equation will be
x y– 1
2 3= and
–x y1
2 1+ =
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72. (c) Given
f(x) = x
3sin x – (1–cos x)
Now,
kx 0
f(x)lim
x→=
kx 0
xsinx–3(1– cosx)
3limx→
= kx 0
1 xsinx–3(1– cosx)lim
3 x→
=
2
kx 0
x x x2xsin cos –6sin1 2 2 2lim
3 x→
= k–1x 0 x 0
x x xsin 2xcos –6sin1 2 2 2lim lim
x3 2x2
→ →
= k–1x 0
x xxcos –3sin1 2 2lim
3 x→
0
k – 1 = 1 k = 2
73. (d)
B
A
R(cos, sin)
Tangent at R ( 2 sin, cos)
x 2cos ysin
2 1
+ = 1 1 1
2 2
xx yy1
a b
+ =
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A =2
,0cos
, B =
10,
sin
Let P(h, k) be the locus of the mid point
(h, k) = 2 1
,2cos 2sin
cos = 1 1
,sin2k2h
=
sin2 + cos2 = 1
2 2
1 1
2h 4k+ = 1
Locus of (h, k) is 2 2
1 1
2x 4y+ = 1
74. (a,c)
B
A
y = f(x) P(x, y)
(1, 1)
3
1 x
Since, BP: AP = 3 : 1, then equation of tangent is Y – y = f’x (X–x) The intercept on the coordinate axes are
A = y
x – –0f '(x)
and B(0, y – x f’(x))
Since, P is internally intercepts a line AB
x =
y3 x – 1 0
f '(x)
3 1
+
+
dy y
dx –3x=
dy 1
–dy 3x
= dx
On integrating both sides, we get xy3 = c Since, curves passes through (1, 1), then c = 1 xy3 = 1
At x = 1
8 y = 2
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75. (a)
y = 2
2
x
(x 1) (x 2)+ +
Using partial fraction concept
y = 2
A B C
(x 1) (x 1) (x 2)+ +
+ + +
2
2
x
(x 1) (x 2)+ +=
2
2
A(x 1)(x 2) B(x 2) C(x 1)
(x 1) (x 2)
+ + + + + +
+ +
2
2
x
(x 1) (x 2)+ +=
2
2
x (A C) x(3A B 2C) (2A 2B C)
(x 1) (x 2)
+ + + + + + +
+ +
Comparing A = –3, B = 1, C = 4
y = 2
–3 1 4
(x 1) (x 1) (x 2)+ +
+ + +
Differentiate w.r.t. x
2 3 2
dy 3 2 4–
dx (x 1) (x 1) (x 2)= +
+ + +
Again differentiate w.r.t. x
2
2 3 4 3
d y –6 6 8
dx (x 1) (x 1) (x 2)= + +
+ + +
2
2 3 4 3
d y –3 3 42
dx (x 1) (x 1) (x 2)
= + + + + +